Method and apparatus for multiple antenna communications, and related systems and computer program

ABSTRACT

An embodiment of an arrangement detects sequences of digitally modulated symbols from multiple sources. The arrangement identifies a suitable set of candidate values for at least one transmitted sequence of symbols and determines for each candidate value a set of sequences of transmitted symbols. The arrangement estimates at least one further set of sequences of transmitted symbols, calculates a metric for each sequence of transmitted symbols, and selects the sequence that maximizes the metric. At the end, a-posteriori bit soft output information for the selected sequence is calculated from the metrics for said sequences. Generally, these calculations are based on the information coming from a channel-state-information matrix and a-priori information on the modulated symbols from a second module, such as a forward error-correction-code (ECC) decoder.

PRIORITY CLAIM

The present application is a Continuation-in-Part of copending U.S. patent application Ser. No. 12/077,073, filed 14 Mar. 2008; application Ser. No. 12/077,073 claims priority to International Patent Application No.: PCT/IB2007/000630, filed 14 Mar. 2007; application Ser. No. 12/077,073 is also a Continuation-in-Part of U.S. patent application Ser. No. 11/989,055, which has a 371(c) date of 18 Jan. 2008, and is now U.S. Pat. No. 8,351,529, issued 8 Jan. 2013; U.S. Pat. No. 8,351,529 is the National Stage Entry of International Patent Application No. PCT/US2006/028256, filed 20 Jul. 2006; and claims the benefit of U.S. Provisional Patent Application No. 60/700,773, filed 20 Jul. 2005; now expired; all of the foregoing patents and patent applications are incorporated herein by reference in their entireties.

RELATED APPLICATION DATA

This application is related to U.S. patent application Ser. No. 12/531,297 entitled METHOD AND APPARATUS FOR MULTIPLE ANTENNA COMMUNICATIONS, COMPUTER PROGRAM PRODUCT THEREFOR, filed on Sep. 14, 2009, which application is incorporated by reference herein in its entirety.

This application is related to U.S. patent application Ser. No. 13/735,943 entitled APPARATUS AND METHOD FOR DETECTING COMMUNICATIONS FROM MULTIPLE SOURCES, filed on Jan. 7, 2013, which application is incorporated by reference herein in its entirety.

TECHNICAL FIELD

An embodiment of the present invention relates to communication technology.

Specifically, an embodiment of the invention was developed by paying attention to its possible use in closely approximating a soft-output-maximum a posteriori detector in multiple antenna communications employing soft-bit information output by an outer error-correction-code decoder.

BACKGROUND

Throughout this description various publications are cited as representative of related art. For the sake of simplicity, these documents will be referred by reference numbers enclosed in square brackets, e.g., [x]. A complete list of these publications ordered according to the reference numbers is reproduced in the section entitled “List of references” at the end of the description. These publications are incorporated herein.

Wireless transmission through multiple antennas, also referred to as MIMO (Multiple-Input Multiple-Output) [1]-[2], currently enjoys great popularity because of the demand of high data rate communication from multimedia services. Many applications are considering the use of MIMO to enhance the data rate and/or the robustness of the link.

Among others, a significant example is provided by the next generation of Wireless Local Area Networks (W-LANs), see e.g., the IEEE 802.11n standard [3]. Another candidate application is represented by mobile “WiMax” systems for fixed wireless access (FWA) [4]-[5]. Besides fourth generation (4G) mobile terminals will likely endorse MIMO technology and as such may represent a very important commercial application for the present arrangement.

A current problem in this area is detecting multiple sources corrupted by noise in MIMO fading channels and generating bit soft output information to be passed to an external outer decoder.

The structure and operation of a narrowband MIMO system can be modelled as a linear complex baseband equation:

Y=HX+N  (1)

where Y is the received vector (size R×1), X the vector of transmitted complex Quadrature Amplitude Modulation (QAM) or Phase Shift Keying (PSK) constellation symbols (size T×1), H is the R×T channel matrix (R and T are the number of receive and transmit antennas, respectively) whose entries are the complex path gains from transmitter to receiver, samples of zero mean Gaussian random variables (RVs) with variance σ²=0.5 per dimension. N is the noise vector of size R×1, whose elements are samples of independent circularly symmetric zero-mean complex Gaussian RVs with variance N₀/2 per dimension. S is the complex constellation size. Equation (1) is considered valid per subcarrier for wideband orthogonal frequency division multiplexing (OFDM) systems.

Maximum-A-Posteriori (MAP) detection is desirable to achieve high-performance, as this is the optimal detection technique in presence of additive white Gaussian noise (AWGN) [6]. If M_(c) is the number of bits per modulated symbol, for every transmitted bit b_(k), k=1, . . . , T·M_(c) it computes the a-posteriori probability (APP) ratio conditioned on the received channel symbol vector

Y:

$\frac{P\left( {b_{k} = \left. 1 \middle| Y \right.} \right)}{P\left( {b_{k} = \left. 0 \middle| Y \right.} \right)}$

Practically, this is commonly handled in the logarithmic domain. Using Bayes' rule the a-posteriori log-likelihood ratios (LLRs) L_(p,k) are computed as

$\begin{matrix} {L_{p,k} = {{\ln \frac{P\left( {b_{k} = \left. 1 \middle| Y \right.} \right)}{P\left( {b_{k} = \left. 0 \middle| Y \right.} \right)}} = {\ln \frac{\sum\limits_{X \in S_{+}^{k}}{{p\left( Y \middle| X \right)}{p_{a}(X)}}}{\sum\limits_{X \in S_{-}^{k}}{{p\left( Y \middle| X \right)}{p_{a}(X)}}}}}} & (2) \end{matrix}$

where s₊ ^(k) is the set of 2^(T·Mc-1) bit sequences having b_(k)=1, and similarly s⁻ ^(k) is the set of bit sequences having b_(k)=0; p_(a)(X) represent the a-priori probabilities of X. They can be neglected if equiprobable symbols are considered, and in this case (2) reduced to the maximum-likelihood (ML) metric.

This is not true when extrinsic information is output by an outer decoder, i.e., in iterative schemes, after the first detection-decoder stage is performed. The basic idea of combined iterative detection and decoding schemes is that the soft-output decoder and the detector exchange and update extrinsic soft information in an iterative fashion, according to a “turbo” decoding principle, in analogy to the iterative decoders first proposed for the Turbo Codes [7] and the subsequent turbo equalization schemes [8] to mitigate inter-symbol interference (ISI) in time varying fading channels.

A general block diagram of such a system is portrayed in FIGS. 4A and 4B that will be further discussed in the following.

Such schemes correspond to replacing the inner soft-in soft-out (SISO) decoder in [7] by the MIMO soft-out detector, and can be considered a turbo spatial-equalization scheme. They were first introduced in [12] and called “Turbo-BLAST”. Other references of interest in that respect are [13]-[14].

From the MIMO system shown in equation (1) and assuming the Channel State Information (CSI) H at the receiver is known, one has:

${p\left( Y \middle| X \right)} \propto {\exp \left\lbrack {{- \frac{1}{2\sigma_{N}^{2}}}{{Y - {HX}}}^{2}} \right\rbrack}$

through a proportionality factor that can be neglected when substituted in equation (2) and where σ_(N) ²=N₀/2. Denoting with L_(a,j) the LLRs output by the decoder of the j-th bit in the transmitted sequence X, i.e., the a-priori (logarithmic) bit probability information, and considering independent bit in a same modulated symbol, equation (2) can be further developed as:

$\begin{matrix} {L_{p,k} = {\ln \frac{\sum\limits_{X \in S_{+}^{k}}{\exp\left( {{{- \frac{1}{N_{0}}}{{Y - {HX}}}^{2}} + {\sum\limits_{j = 1}^{{TM}_{c}}{{b_{j}(X)}\frac{L_{a,j}}{2}}}} \right)}}{\sum\limits_{X \in S_{-}^{k}}{\exp\left( {{{- \frac{1}{N_{0}}}{{Y - {HX}}}^{2}} + {\sum\limits_{j = 1}^{{TM}_{c}}{{b_{j}(X)}\frac{L_{a,j}}{2}}}} \right)}}}} & (3) \end{matrix}$

where b_(j)(X)={±1} indicates the value of the j-th bit in the transmitted sequence X in binary antipodal notation.

Maximum A-posteriori Probability (MAP)—or also Maximum Likelihood (ML)—detection involves an exhaustive search over all the possible S^(T) sequences of digitally modulated symbols: such a search becomes increasingly unfeasible with the growth of the spectral efficiency.

From equation (3) the following metric can be identified:

$\begin{matrix} {{D(X)} = {{{{- \frac{1}{N_{0}}}{{Y - {HX}}}^{2}} + {\sum\limits_{j = 1}^{{TM}_{c}}{{b_{j}(X)}\frac{L_{a,j}}{2}}}} = {{- D_{ED}} + D_{a}}}} & (4) \end{matrix}$

where D_(ED) is Euclidean distance (ED) term and D_(a) is the a-priori term. The summation of exponentials involved in equation (4) is usually approximated according to the so-called “max-log” approximation:

$\begin{matrix} {{\ln {\sum\limits_{x}{\exp \left\lbrack {D(X)} \right\rbrack}}} \cong {\ln \; {\max\limits_{x}{\exp \left\lbrack {D(X)} \right\rbrack}}}} & (5) \end{matrix}$

Then equation (2) can be re-written as:

$\begin{matrix} {L_{p,k} \cong {{\max\limits_{X \in S_{+}^{k}}{D(X)}} - {\max\limits_{X \in S_{-}^{k}}{D(X)}}}} & (6) \end{matrix}$

corresponding to the so-called max-log-MAP detector. To conclude the description of the ideal detector, the a priori information L_(a,k) is subtracted, so that the detector outputs the extrinsic information L_(e,k) to be passed to an outer decoder:

L _(e,k) =L _(p,k) −L _(a,k)  (7)

Because of their reduced complexity, sub-optimal linear detection procedures like Zero-Forcing (ZF) or Minimum Mean Square Error (MMSE) [9] are widely employed in wireless communications. To improve their performance, nonlinear detectors based on the combination of linear detectors and spatially ordered decision-feedback equalization (O-DFE) were proposed in [10]-[11]. There, the principles of interference cancellation and “layer” (i.e., antenna) ordering are established: accordingly, in the remainder of this document the terms “layer” and “antenna” will be used as synonymous.

The related systems suffer from performance degradation due to noise enhancements and error propagation; moreover, they are not suitable for soft-output generation.

More attractive for bit interleaved coded modulation (BICM) systems are soft interference cancellation (SIC) iterative MMSE and error correction decoding strategies [12]-[14]. They represent a suboptimal way to compute equations (2)-(3) where the ED term in (4) is replaced by linear MMSE filtering and interference cancellation. Unfortunately they suffer from latency and complexity disadvantages, and also their performance can be significantly improved, as shown in the present document.

Another important class of detectors is represented by the so-called list detectors [15]-[18]. These are based on a combination of the ML and DFE principles. The basic common idea exploited in list detectors (LD) is to divide the streams to be detected into two groups: first, one or more reference transmit streams are selected and a corresponding list of candidate constellation symbols is determined; then, for each sequence in the list, interference is cancelled from the received signal and the remaining symbol estimates are determined by as many sub-detectors operating on reduced size sub-channels. By searching all possible S cases for a reference layer, adopting O-DFE for the remaining T−1 sub-detectors, and utilizing a properly optimized layer ordering technique, a LD is able to maintain degradation within fractions of a dB in comparison with ML performance.

Notably, this can be accomplished through a parallel implementation. A drawback of this approach lies in that the computational complexity is high as T O-DFE detectors for T−1 sub-streams have to be computed. If efficiently implemented, it involves O(T⁴) complexity. Another major shortcoming of the prior work in list based detection is the absence of a procedure to produce soft bit metrics for use in coding and decoding procedures. For this reason, also Turbo or equivalently iterative SIC schemes have not been designed for LDs.

Another important family of ML-approaching detectors is based on lattice decoding procedures, applicable if the received signal can be represented as a lattice [19]-[20]. The so-called Sphere Decoder (SD) [25]-[26] is the most widely known example for these detectors and can be utilized to attain hard-output ML performance with significantly reduced complexity. However SD suffers from some important disadvantages, most notably, is not suitable for a parallel VLSI implementation; the number of lattice points to be searched is non-deterministic, sensitive to the channel and noise realizations, and to the initial radius. This is not desirable for real-time high-data rate applications. Finally, generation of soft output metrics is not easy with known lattice decoding procedures. As said for LDs, for this reason also Turbo or equivalently iterative SIC schemes have not been designed in conjunction with SD.

Besides performance (the benchmarks are optimal ML detection and linear MMSE, ZF on the two extremes, respectively) at least four basic features should be complied with by a MIMO detection arrangement in order to be effective and implementable in next generation wireless communication procedures:

-   -   high (i.e., optimal or near-optimal) performance;     -   reduced overall complexity;     -   the capability of generating bit soft output values, as this         yields a significant performance gain in wireless systems         employing error correction codes (ECC) coding and decoding         procedures;     -   the capability of the architecture of the procedure to be         parallelized, which is significant for an Application Specific         Integrated Circuit (ASIC) implementation and also to yield the         low latency required by a real-time high-data rate transmission.

SUMMARY

An embodiment of the invention provides a fully satisfactory response to those features, while also avoiding the shortcomings and drawbacks of the prior art arrangements as discussed in the foregoing.

One or more embodiments of the invention relate to a method, a corresponding apparatus (a detector and a related receiver), as well as a corresponding related computer program product, loadable in the memory of at least one computer and including software code portions for performing the steps of the method when the product is run on a computer. As used herein, reference to such a computer program product is intended to be equivalent to reference to a computer-readable medium containing instructions for controlling a computer system to coordinate the performance of the method. Reference to “at least one computer” is evidently intended to highlight the possibility for the method to be implemented in a distributed/modular fashion among software and hardware components.

An embodiment described herein provides a method and apparatus to detect sequences of digitally modulated symbols, transmitted by multiple sources (e.g., antennas) and generate near-optimal extrinsic bit soft-output information from the knowledge of the a-priori information from an outer module, namely a soft-output error correction code decoder, providing:

-   -   soft-output performance very close to that of the optimal MAP         technique;     -   implementation complexity extremely lower than that of the         impractical MAP and high degree of parallelism as may be         required by VLSI chip realizations.

No other soft-output MAP or near-MAP detectors able to yield at the same time good performance and a structure desirable for VLSI implementations have been proposed by others.

Such extrinsic information represents a refined version of the original input a-priori information and is then typically useful in iterative schemes featuring an inner detector, a deinterleaver, an outer module like a SISO error correction code decoder, and an interleaver on the feedback path.

An embodiment of the arrangement described herein is a detector wherein, if no a-priori information is available from an outer decoder, the detector achieves optimal or near-optimal max-log performance using two or more than two transmit antennas respectively. Conversely, if a-priori information is fed back to the detector from an outer decoder, then the detector provides a high performance and computationally efficient iterative or “turbo” scheme including the detector, acting as “inner” module, the outer decoder, and optionally an interleaver and related deinterleaver. Optionally, all, or part of the layers (or antennas, or sources) considered for the detection can be ordered employing properly devised techniques.

In brief, an embodiment of the arrangement described herein provides a simplified yet near-optimal method to compute equation (6), and therefore equation (7): i.e., it finds subsets of s₊ ^(k) (s⁻ ^(k)) with much lower cardinality and allowing a close approximation of the final result (6).

A possible embodiment of the arrangement described herein overcomes the limitations of the prior arrangements discussed in the foregoing, by means of a detector for multiple antenna communications that detects sequences of digitally modulated symbols transmitted by multiple antennas, or sources, processes “a-priori” input bit soft information output by an outer decoder, and generates “extrinsic” bit soft-output information to be passed back to an external decoder. The decoder is thus in position to generate improved “a-priori” information to be fed back to the detector for a further “iteration”. The process ends after a given number of loops or iterations are completed.

A possible embodiment of the arrangement described herein concerns a detector comprising several stages adapted to operate, for example, in the complex or real domain, respectively. Firstly, by operating in the real domain only, the system is translated into the real domain through a novel lattice representation. Then, the (real or complex) channel matrix undergoes a “triangularization” process, meaning that through proper processing it is factorized in two or more product matrices of which one is triangular. Finally, the maximization problems expressed by equation (6) above is approximated by using two basic concepts: (a) determining a suitable subset of all the possible transmit sequences; (b) performing an approximate maximization of the two terms in (6) through separately maximizing the two metrics (−D_(ED)) and D_(a) (4) over suitably selected reduced sets of transmit sequences.

The basic idea to maintain low complexity is to resort to the principle of successive layer detection, or spatial DFE (Decision-Feedback Equalization), but taking into account in addition also the information provided by the a-priori metric D_(a). No other near-MAP detectors able to efficiently process D_(a) have been proposed. Again, additionally, and optionally, all or part of the layers considered for the detection can be ordered employing a properly designed layer ordering technique.

Overall, an embodiment of the arrangement described herein achieves optimal max-log ML performance for two transmit antennas if no a-priori information is available from an outer decoder, and near-optimal for more than two transmit antennas. If a-priori information is available from the decoder, an embodiment of the invention computes near-optimal bit APPs to be passed to an external decoder. In all cases, the embodiment yields performance very close to that of the optimum MAP (ML if no a-priori information is available at the input of the detector) and has a much lower complexity as compared to a MAP (or ML) detection method and apparatus, and to the other state-of-the-art detectors having near-MAP (near-ML) performance. If more than two transmit sources are present, the order of all, or part of, the layers considered for detection may affect the performance significantly.

Advantageously, an embodiment described herein involves ordering all, or part of, the sequence of layers considered for the detection process.

This embodiment is thus suitable for highly parallel hardware architectures, and is thus adapted for VLSI implementations and for applications requiring a real-time (or in any case low latency) response.

Specifically, this embodiment concerns a combined detector and decoder of multiple antenna communications, that exchange specific quantities (extrinsic and a-priori soft information, often in the logarithmic domain, LLRs) in an iterative fashion. The iterative detector can be implemented in hardware (HW) according to several different architectures.

At a general level, it is intended that at least the three following options are considered as possible HW implementations for an embodiment of the present invention:

-   1) data re-circulation using one HW instantiation of the loop     depicted in FIG. 2 can be performed at a higher frequency clock than     the output data rate required by the considered application; -   2) a pipelined HW structure built by cascading several     instantiations, one per each iteration, of the series of inner     detector, optional deinterleaver, outer decoder, optional     interleaver; the block diagram is depicted in FIG. 2. Compared to     the above reported HW structure: if N is the number of iterations,     for a same clock frequency, N times higher speed (i.e., data rate)     can be achieved at the expense of N times HW complexity; -   3) any combination of the above reported HW structures.

Additionally and optionally, all—or part of—the layers considered for the detection can be ordered employing a suitably designed ordering technique. An embodiment of the layer ordering method includes the following sequence of steps, to be repeated a given number of times according to the implemented ordering technique: permuting pairs of columns of the channel matrix; pre-processing the permuted channel matrix in order to factorize it into product terms of which one is a triangular matrix; based on the processed channel coefficients, defining and properly computing the post-processing SNR for the considered layers; based on the value of the aforementioned SNRs, determining the order of the layers by applying a given criterion.

In an embodiment the number of receiving antennas is equal to the number of transmitting antennas minus one. In this case, the complex channel state information matrix H might be processed by factorizing the channel state information matrix H into an orthogonal matrix and a triangular matrix with its last row eliminated.

BRIEF DESCRIPTION OF THE DRAWINGS

For a more complete understanding of this disclosure and its features, reference is now made to the following description of exemplary embodiments, taken in conjunction with the accompanying drawings.

FIGS. 1A and 1B illustrate example systems for detecting communications from multiple sources in accordance with this disclosure.

FIG. 2 illustrates a typical single-carrier MIMO transmitter and related receiver in accordance with this disclosure.

FIG. 3 illustrates a typical MIMO-OFDM transmitter and related receiver in accordance with this disclosure.

FIGS. 4A and 4B illustrate example of two alternative single-carrier methods for computing a-posteriori soft-output information of multiple sources adapted for use in accordance with this disclosure.

FIGS. 5A and 5B illustrate example of two alternative OFDM methods for computing a-posteriori soft-output information of multiple sources for use in accordance with this disclosure.

FIGS. 6A and 6B illustrate example methods for detecting communications from multiple sources in accordance with this disclosure.

DETAILED DESCRIPTION

FIGS. 1A through 6B and the various embodiments described in this disclosure are by way of illustration only and should not be construed in any way to limit the scope of the invention. Those skilled in the art will recognize that the various embodiments described in this disclosure may easily be modified and that such modifications fall within the scope of this disclosure.

FIGS. 1A and 1B illustrate exemplary systems for detecting multiple communication sources in accordance with this disclosure. In particular, FIGS. 1A and 1B illustrate example MIMO systems. These embodiments are for illustration only. Other embodiments of the systems could be used without departing from the scope of this disclosure.

As shown in FIG. 1A, the system includes a transmitter 10 and a receiver 30. The transmitter 10 includes or is coupled to multiple transmit antennas 20 (denoted T1-Tn), and the receiver 30 includes or is coupled to multiple receive antennas 22 (denoted R1-Rm). Typically, each receive antenna 22 receives signals from all of the transmit antennas 20, and where m is the number of receive antennas and n is the number of transmit antennas, m≧n−1 in an embodiment.

As shown in FIG. 1B, the system could also include multiple transmitters 10 a-10 t and the receiver 30. In this example, each of the transmitters 10 a-10 t includes or is coupled to a single transmit antenna 20.

Each of the transmitters 10, 10 a-10 t in FIGS. 1A and 1B represents any suitable device or component capable of generating or providing data for communication. The receiver 30 represents any suitable device or component capable of receiving communicated data.

In these examples, the receiver 30 includes an iterative detector and decoder 32, which detects multiple communications from multiple sources and computes a-posteriori soft-output information. The multiple sources could include a single transmitter 10 with multiple antennas 20, multiple transmitters 10 a-10 t with one or several antennas 20 each, or a combination thereof. The iterative detector and decoder 32 may operate as described in more detail below.

The block 32 includes any hardware, software, firmware, or combination thereof for detecting multiple communications from multiple sources. The block 32 could be implemented in any suitable manner, such as by using an Application Specific Integrated Circuit (“ASIC”), Field Programmable Gate Array (“FPGA”), digital signal processor (“DSP”), or microprocessor. As a particular example, the block 32 could include one or more processors 34 and one or more memories 36 capable of storing data and instructions used by the processors 34.

Either of the systems can be represented as in equation (1) above, which may be valid for both single-carrier flat fading MIMO systems and for wideband OFDM systems (per subcarrier). The interpretation of equation (1) is that the signal received at each antenna 22 by the receiver 30 represents the superposition of T transmitted signals corrupted by multiplicative fading and AWGN.

Although FIGS. 1A and 1B illustrate examples of systems for detecting multiple communication sources, various changes may be made to FIGS. 1A and 1B. For example, a system could include any number of transmitters and any number of receivers. Also, each of the transmitters and receivers could include or be coupled to any number of antennas.

FIG. 2 illustrates a more detailed example of a single carrier MIMO transmitter and receiver. Typical transmitter baseband digital elements/procedures are grouped as 100. As a counterpart, block 300 represents typical baseband elements/procedures of a receiver.

In particular, an embodiment of the iterative detection and decoder 32 (FIG. 1) includes as distinguishable units a MIMO detector 320, a deinterleaver 324, a FEC decoder 322 and an interleaver 326. Interleaver 326 is implemented according to the same permutation law as interleaver 126, the latter being at the transmitter side, with the difference that the interleaver 126 has (hard-decision) bit input/output, while the interleaver 326 has soft bit information input/output. Deinterleaver 324 implements the reciprocal permutation law of blocks 126 and 326. Blocks 324 and 326 are optionally present as components of block 32.

As well known to those skilled in the art, the block 100 further has associated there with a FEC encoder 124, and a set of mapper blocks 106, filter blocks 108 and digital-to-analog (D/A) converters 110 in order to convert an input bit stream IB for transmission over the set of transmission antennas 20.

Similarly the block 300 has additionally associated there with a set of analog-to-digital (A/D) converters 310 and filter blocks 308 for each of the antennas 22 of the receiver, providing the received data to the detector 32, which creates the final output bit stream OB. Again those skilled in the art will appreciate the presence of a channel estimator 312 in the receiver block 300, which provides respective channel estimation data to the MIMO detector 320. Any channel estimator may be used, and any forward error correction (FEC) code might be used in the FEC encoder 124 and FEC decoder 326, such as Reed-Solomon, convolutional, low-density parity check code, and turbo encoding schemes.

Again, these embodiments are for illustration only. Other embodiments of the systems 100, 300 and 32 may be used without departing from the scope of this disclosure.

The deinterleaver 324 and the interleaver 326 are optional in the sense that their usefulness depends on the adopted error correction code. In some cases they could be eliminated without impairing the performance of the receiver.

FIG. 3 illustrates an alternative embodiment of a MIMO-OFDM transmitter and receiver. Again, typical transmitter baseband digital elements/procedures are grouped as 100 and typical receiver baseband elements/procedures are grouped as 300.

In particular, the iterative detection and decoder 32 typically includes as distinguishable units a MIMO-OFDM detector 320, a deinterleaver 324, a FEC decoder 322 and an interleaver 326. Interleaver 326 is implemented according to the same permutation law as 126, the latter being at the transmitter side, with the difference that the interleaver 126 has (hard-decision) bit input/output, while the interleaver 326 has soft bit information input/output. Deinterleaver 322 implements the reciprocal permutation law of 126 and 326.

In comparison to the transmission system of FIG. 2, the system of FIG. 3 further includes a set of framing and OFDM modulator blocks 114 at the transceiver side and the respective OFDM demodulator and deframing blocks 314 at the receiver side. As well known to those skilled in the art a typical receiver further includes a synchronisation block 316 for improving the channel estimation by the block 312.

Blocks 324 and 326 are optionally present as components of 32.

In the following will be explained embodiments of single-carrier and OFDM transmission systems, with particular attention being paid to the presence of the interleaver 326 and the deinterleaver 324. Once again, these embodiments are for illustration only. Other embodiments of the systems 100, 300 and specifically 32 could be used without departing from the scope of this disclosure.

Two general block diagrams, alternative to each other, are represented in FIGS. 4A and 4B.

The deinterleaver 324 and the interleaver 326 are optional in the sense that their usefulness depends on the adopted error correction code. In fact, FIG. 4B shows the same iterative loop as of FIG. 4A, however, without the interleaver 326 and deinterleaver 324. In some cases they could be eliminated without impairing the performance of the receiver.

The detector 320 receives as input the received signal Y, as shown, e.g., in equation (1), the channel estimates, such as the channel estimation matrix H as shown in equation (1), and the a-priori bit soft information, such as the a-priori bit LLRs L_(a), and then approximates internally the a-posteriori LLRs L_(p) and outputs the extrinsic information L_(e). Unless otherwise stated, the bit soft-output generation will be referred to in the logarithmic domain with no loss of generality, i.e., it is intended the ideas will remain valid if other implementation choices are made, i.e., of regular probabilities instead of LLRs are dealt with.

More specifically, FIGS. 4A and 4B illustrate two alternative methods to implement the single carrier MIMO iterative detector and decoder 32. The MIMO detector 320 in both figures receives as input the received sequence Y and the estimated CSI H.

FIG. 4A uses a deinterleaver 324 having as input the bit soft-output information output by the MIMO detector 320, and a reciprocal interleaver 326 having as input the bit soft-output information output by a SISO FEC decoder 322.

The flow is repeated for a given number of iterations and the decoder 322 determines the final output bit stream OB.

FIG. 4B is the same as FIG. 4A except that the deinterleaver 324 and the reciprocal interleaver 326 are not present.

FIGS. 5A and 5B illustrate two alternative methods to implement the MIMO-OFDM iterative detection and decoder 32.

The MIMO detector 320 in both figures receives as input the received sequence Y and the estimated CSI H relatively to a set of OFDM subcarriers.

As well known to those skilled in the art, the data coming from the R antennas 22 of the receiver can be converted into the K OFDM subcarriers, e.g., by means of a set of Fast Fourier Transformation (FFT) blocks 328 and a multiplexer 330. The single-carrier case of FIGS. 2, 4A and 4B can be considered as a special case of such a system when K=1.

At least one detector block 320 then processes the K OFDM subcarriers. This can be done serially, in parallel by means of K detector blocks or any combination of both. The parallel structure represented in FIGS. 5A and 5B is considered as an example only and is not limiting.

The outputs of the detector units 320 are then serialized by means of the parallel to serial (P/S) converter block 332.

FIG. 5A uses a deinterleaver 324 having as input the bit soft-output information output by the converter block 332, and a reciprocal interleaver 326 having as input the bit soft-output information output by a SISO FEC decoder 322.

The output of the interleaver 326 is demultiplexed by a serial to parallel (S/P) converter block 334 and fed back to the detector units 320 according to the OFDM subcarriers the soft bits output by 334 belong to. The flow is repeated for a given number of iterations and the decoder 322 provides the output bit stream OB.

FIG. 5B shows the same scheme as FIG. 5A except that the deinterleaver 324 and the reciprocal interleaver 326 are not present.

Unless otherwise stated, the description herein deals with probability ratios in the logarithmic domain, i.e., LLRs represent the input-output soft information, but the same ideas and procedures can be generalized in a straightforward manner to the case of regular probabilities.

As indicated, the arrangement described herein deals with a simplified yet near-optimal method to compute equation (6), and therefore equation (7). Namely, at each iteration the arrangement finds subsets of s₊ ^(k) (s⁻ ^(k)), which have a reduced cardinality and which allow an approximation of the final result of equation (6).

The arrangement described herein deals with the problem of bit soft output generation as a function of the candidate symbols transmitted in turn by each transmit antenna. This means that even if for the sake of conciseness the following embodiments are described with reference to a generic transmit antenna t, the related processing is intended to be repeated for T times with t=1, . . . T respectively.

More precisely, generating bit soft-output information for the bits corresponding to the symbols transmitted by all the antennas (or sources) comprises repeating the considered steps and operations a number of times equal to the number of transmit antennas (or sources), each time associated with a different disposition of layers corresponding to the transmitted symbols, each layer being a reference layer in only one of the dispositions, and disposing the columns of the channel matrix accordingly prior to further processing. The meaning of ‘reference layer’ will be clear from the following descriptions.

In other words the arrangement determines overall T subsets U_(t) of the entire possible transmitted symbol sequence set. Each subset has per iteration cardinality WS_(C), with S_(C)≦2^(Mc), instead of 2^(TMc) of the whole set.

W depends upon the chosen embodiment. It can be kept constant (i.e., independent of T) in some embodiments, thus resulting in a complexity of the demodulation that linearly grows with T, instead of exponentially growing.

The entire process is repeated for a number of stages (or iterations), wherein a modified version of the a-priori LLRs L_(a) is output by decoder at each iteration. At each iteration, the detector processes the a-priori LLRs L_(a) and subtracts them from L_(p) of equation (6) to compute equation (7).

In order to compute the bit LLRs corresponding to transmit antenna t a suitable set of transmit sequences X can be generated as will be explained in the following. The following description refers to a single iteration and it is to be understood that said extrinsic information (L_(e)) is calculated in at least two processing instances (i.e. stages, or iterations) by:

-   -   calculating in a first instance the extrinsic information (L₀)         without any a-priori information (L_(a)), and     -   calculating in a second instance the extrinsic information         (L_(e)) from the a-priori information (L_(a)) fed back from a         module such as a forward error correction code decoder, until a         decision on the bit value is made after a given number of         instances.

It should be understood that the term iterations or stages are exchangeable, because the arrangement could be implemented by a single detector and decoder block iterating on the various data or by several detector and decoder blocks being connected in a cascaded structure such as, e.g., a pipelined structure.

The complex modulated symbol X_(t) spans all the possible (QAM or PSK) complex constellations S, or a properly selected subset thereof, denoted by C, with cardinality S_(C).

Said symbol X_(t) represents a reference transmit symbol, and its possible values represent candidate values to be used in the demodulation scheme.

For each of the S_(C) possible values x_(t)= X, as many corresponding sets of transmit sequences X, denoted with U_(t)( X), are determined.

Each said set of sequences of transmitted symbols U_(t)( X) is then obtained by grouping together (i.e. listing in sequences of T symbols each) the candidate value of the reference symbol, X_(t)= X, and at least one further set of estimated sequences of the remaining (i.e. other than the candidates) transmitted symbols.

How to estimate such sequences is detailed in the exemplary embodiments.

It should be remarked that in order to include all possible X one should have:

$U_{t} = \left\{ {\bigcup\limits_{\forall{\overset{\_}{X} \in S}}{U_{t}\left( \overset{\_}{X} \right)}} \right\}$

where U_(t)( X)={X:x_(t)= X}. A basic property of an embodiment of the invention instead is to build sets of sequences U_(t) such that they maintain a low cardinality, at the same time without impairing significantly the performance of the MAP detector. The final set S_(t) used to compute bit LLRs relative to X_(t) is then built by choosing those elements in U_(t) maximizing equation (4),i.e.:

$\begin{matrix} {{{S_{t}\left( \overset{\_}{X} \right)} = {\underset{X \in {U_{t}{(\overset{\_}{X})}}}{argmax}{D(X)}}}{and}} & (8) \\ {S_{t} = \left\{ {\bigcup\limits_{\forall{\overset{\_}{X} \in c}}{S_{t}\left( \overset{\_}{X} \right)}} \right\}} & (9) \end{matrix}$

Calculating D(X) for xεU_(t)( X) means calculating a metric for each of said set of sequences of transmitted symbols U_(t)( X). Similarly, solving equation (8) means selecting the sequence that maximizes the metric D(X), one for each candidate value (S_(t)( X)), and storing S_(t) and D(X) for x≡S_(t)( X) means storing the value of the maximum related metric and the associated selected sequence.

Moreover, calculating D(X) according to equation (4) in particular means calculating an a-posteriori probability metric, that also includes the steps of summing the opposite of an Euclidean distance term to the a-priori probability term for the selected candidate sequences X.

Actually, it is not computationally expensive and may offer significant performance improvements to consider also the sequences X belonging to the other sets S_(j) with j≠t when computing bit LLRs relative to X_(t). Mathematically this means that instead of s_(t)( X) the modified set S_(t)′( X) can be used instead:

$\begin{matrix} {{{S_{t}^{\prime}\left( \overset{\_}{X} \right)} = \begin{Bmatrix} {{\underset{{X \in {{U_{t}{(\overset{\_}{X})}}\mspace{14mu} {OR}\mspace{14mu} X} \in {S_{j \neq t}:X_{t}}} = \overset{\_}{X}}{argmax}{D(X)}},} & {\forall{\overset{\_}{X} \in c}} \end{Bmatrix}}{and}} & (10) \\ {S_{t}^{\prime} = \left\{ {\bigcup\limits_{\forall{\overset{\_}{X} \in c}}{S_{t}^{\prime}\left( \overset{\_}{X} \right)}} \right\}} & (11) \end{matrix}$

In the following, it is understood that the embodiments equally apply to both S_(t) as shown in equation (9) and S_(t)′ as shown in equation (11) though reference will be made to S_(t) only to simplify the notation.

It should be remarked that a hard-decision estimate of the sequence X could then be obtained as:

$\begin{matrix} {{\hat{X}}^{t} = {\underset{\overset{\_}{X} \in c}{argmax}\left\{ {D\left( {S_{t}\left( \overset{\_}{X} \right)} \right)} \right\}}} & (12) \end{matrix}$

Finally, an embodiment of the invention approximates equation (6) at every iteration using an updated version of the metric D(X), through:

$\begin{matrix} {L_{p,i} \cong {{\max\limits_{X \in {S_{t}^{j}{(1)}}}{D(X)}} - {\max\limits_{X \in {S_{t}^{j}{(0)}}}{D(X)}}}} & (13) \end{matrix}$

where S_(t) ^(j)(1) and S_(t) ^(j)(0) are a set partitioning of S_(t):

S _(t) ^(j)(a)={XεS _(t) :b _(M) _(c) _((t−1)+j)(X)=a}, a={0,1},  (14)

and where t is the t-th antenna with 1≦t≦T, j the j-th bit in the modulated symbol with 1≦j≦M_(c), and i denotes the i-th bit in the sequence output by the detector with i=M_(c)(t−1)+j.

Calculating equation (13) corresponds to calculating a-posteriori bit soft output information (L_(p)) for the selected sequences (X) from the set of metrics for the sequences D(X).

In the following, are described methods and apparatuses to choose S_(t) with reduced complexity compared to the Max-Log-MAP detector and maintaining at the same time a near-optimal performance.

A first embodiment foresees suitable channel pre-processing to translate the system equation (1) into an equivalent one. The procedure is comprised of the distinct stages described in the following.

Channel Processing and Demodulation

In order to decouple the problem in turn for the different transmit antennas and efficiently determine U_(t) it is useful to perform a channel matrix “triangularization” process, meaning that through proper processing it is factorized in two or more product matrices one of which is triangular. It is understood that different matrix processing may be applied to H. Examples include, but are not limited to, QR and Cholesky decomposition procedures [30].

Performing a Cholesky decomposition of complex channel state information matrix includes:

-   -   forming a Gram matrix using the channel state information         matrix;     -   performing a Cholesky decomposition of the Gram matrix, and     -   calculating the Moore-Penrose matrix inverse of the channel         state information matrix, resulting in a pseudoinverse matrix.

This pseudoinverse matrix may then be used to process a complex vector of received sequences of digitally modulated symbols by multiplying the pseudoinverse matrix by the received vector.

In the following the alternative QR decomposition will be used, without loss of generality.

To simplify computations, a permutation matrix Π(t) is introduced, which circularly shifts the elements of X (and consequently the order of the columns of H, too), such that the symbol X_(t) under investigation moves to the last position:

Π_(t) =[U _(t+1) . . . U _(T) U ₁ . . . U _(t)]^(T)  (15)

where U_(t) is a column vector of length T with all zeros but the t-th element equal to one. Then equation (1) can be rewritten as:

Y=HΠ _(t) ⁻¹Π_(t) X+N=HΠ _(t) ^(T)Π_(t) X+N  (16)

The arrangement entails processing T systems (16) characterized by T different dispositions of layers corresponding to the transmitted symbols, each layer being a reference layer in only one of the dispositions, and disposing the columns of the channel matrix accordingly prior to further processing.

Specifically, T different QR decompositions have to be performed, one for each Π_(t):

HΠ _(t) ^(T) =Q _(t) R _(t)  (17)

where Q_(t) is an orthonormal matrix of size R×T and R_(t) is a T×T upper triangular matrix.

The ED metrics in equation (4) can be equivalently rewritten as:

$\begin{matrix} \begin{matrix} {D_{ED} = {\frac{1}{N_{0}}{{Y - {HX}}}^{2}}} \\ {= {\frac{1}{N_{0}}{{Y - {Q_{t}R_{t}\Pi_{t}X}}}^{2}}} \\ {= {\frac{1}{N_{0}}{{{Q_{t}^{H}Y} - {R_{t}\Pi_{t}X}}}^{2}}} \\ {= {\frac{1}{N_{0}}{{Y_{t}^{\prime} - {R_{t}X_{t}^{\prime}}}}^{2}}} \end{matrix} & (18) \end{matrix}$

where Y_(t)′=Q_(t) ^(H)Y and X_(t)′=Π_(t)X.

It should be noticed that no change in the noise statistics is introduced by the QR decomposition in the equivalent noise term N_(t)′=Q_(t) ^(H)N.

Calculating equation (18) might be performed by calculating the Euclidean distance term between the received vector and the product of the channel state information matrix (H) and a possible transmit sequence (X).

It is useful to enumerate the rows of R_(t) from top to bottom and create a correspondence with the different transmit antennas (or layers), ordered as in x_(t)′. Then the QAM symbol X_(t) is located in the T-th position of X_(t)′ and corresponds to the last row of R_(t), which acts as an equivalent triangular channel. The demodulation principle is to select the T-th layer as the reference one and determine for it a list of candidate constellation symbols. Then, for each sequence in the list, interference is cancelled from the received signal and the remaining symbol estimates are determined through interference nulling and cancelling, or spatial DFE. Exploiting the triangular structure of the channel, the estimation of the remaining T−1 complex symbols can be simply implemented through a slicing operation to the closest QAM (or PSK) constellation symbol, thus entailing a negligible complexity. This process can be called root conditioning. In order to compute reliable bit soft-output information the process needs to be repeated T times for T QR decompositions according to equations (15)-(18). More details can be found in [21].

As an example, in the following the process is described for T=2 transmit and R receive antennas. After the QR decomposition one has:

$\begin{matrix} {{Y_{2}^{\prime} = \begin{bmatrix} Y_{1} \\ Y_{2} \end{bmatrix}},{R_{2} = \begin{bmatrix} r_{1,1} & r_{1,2} \\ 0 & r_{2,2} \end{bmatrix}},{X_{2}^{\prime} = \begin{bmatrix} X_{1} \\ X_{2} \end{bmatrix}}} & (19) \end{matrix}$

Then from equation (4) and (18) follows:

$\begin{matrix} \begin{matrix} {D_{ED} = {\frac{1}{N_{0}}{{Y_{2}^{\prime} - {R_{2}X_{2}^{\prime}}}}^{2}}} \\ {= {\frac{1}{N_{0}}\left( {{{Y_{2} - {r_{2,2}X_{2}}}}^{2} + {{Y_{1} - {r_{1,1}X_{1}} - {r_{1,2}X_{2}}}}^{2}} \right)}} \end{matrix} & (20) \end{matrix}$

Under the hypothesis that X_(x)= X has been transmitted, X₁ which minimizes the distance between Y and H·[X₁ X₂]^(T) can be found through thresholds, i.e., slicing to the closest constellation element (denoted in formulas through the “round” function):

$\begin{matrix} \begin{matrix} {{{\hat{X}}_{1}\left( \overset{\_}{X} \right)}_{X:{({X_{2} = \overset{\_}{X}})}} = {{argmin}{{Y_{2}^{\prime} - {R_{2}X_{2}^{\prime}}}}^{2}}} \\ {= {\arg {\min\limits_{X_{1}}{{Y_{1} - {r_{1,1}X_{1}} - {r_{1,2}\overset{\_}{X}}}}^{2}}}} \\ {= {\underset{X_{1} \in c}{round}\left( \frac{Y_{1} - {r_{1,2}\overset{\_}{X}}}{r_{1,1}} \right)}} \end{matrix} & (21) \end{matrix}$

If L_(a,i)=0, with i=1, . . . , TM_(c), the hard-output ML sequence can then be determined as

$\begin{matrix} {\left\{ {{\hat{X}}_{1},{\hat{X}}_{2}} \right\} = {\arg {\max\limits_{X_{2} \in C}\left\lbrack {- {D_{ED}\left( {{{\hat{X}}_{1}\left( X_{2} \right)},X_{2}} \right)}} \right\rbrack}}} & (22) \end{matrix}$

where S spans the whole set of complex constellation symbols. Thus the complexity of the ML detector is reduced from 2^(2M) ^(c) to 2^(M) ^(c) sequences to be searched. The same demodulation principle can be used to compute optimal max-log LLRs for the bit corresponding to symbol X₂ as:

$\begin{matrix} {L_{p,i} = {{\max\limits_{X \in {S_{2}^{j}{(1)}}}\left\lbrack {- {D_{ED}\left( {{{\hat{X}}_{1}\left( X_{2} \right)},X_{2}} \right)}} \right\rbrack} - {\max\limits_{X \in {S_{2}^{j}{(0)}}}\left\lbrack {- {D_{ED}\left( {{{\hat{X}}_{1}\left( X_{2} \right)},X_{2}} \right)}} \right\rbrack}}} & (23) \end{matrix}$

where 1≦j≦M_(c), i=M_(c)+j denotes the i-th bit in the sequence output by the detector, and S₂ ^(j)(1), S₂ ^(j)(0) are a set partitioning of S₂:

S ₂ ^(j)(a)={XεS ₂ :b _(M) _(c) _(+j) =a}, a={0,1}  (24)

Similarly, an equivalent system can be derived:

$\begin{matrix} {{Y_{1}^{\prime} = \begin{bmatrix} Y_{1}^{\prime} \\ Y_{2}^{\prime} \end{bmatrix}},{R_{1} = \begin{bmatrix} r_{1,1}^{\prime} & r_{1,2}^{\prime} \\ 0 & r_{2,2}^{\prime} \end{bmatrix}},{X_{1}^{\prime} = \begin{bmatrix} X_{2} \\ X_{1} \end{bmatrix}}} & (25) \\ {\begin{matrix} {D_{ED} = {\frac{1}{N_{0}}{{Y_{1}^{\prime} - {R_{1}X_{1}^{\prime}}}}^{2}}} \\ {= {\frac{1}{N_{0}}\left( {{{Y_{2}^{\prime} - {r_{2,2}^{\prime}X_{1}}}}^{2} + {{Y_{1}^{\prime} - {r_{1,1}^{\prime}X_{2}} - {r_{1,2}^{\prime}X_{1}}}}^{2}} \right)}} \end{matrix}{and}} & (26) \\ \begin{matrix} {{{\hat{X}}_{2}\left( \overset{\_}{X} \right)}_{X:{({X_{1} = \overset{\_}{X}})}} = {{argmin}{{Y_{1}^{\prime} - {R_{1}X_{1}^{\prime}}}}^{2}}} \\ {= {\arg {\min\limits_{X_{2}}{{Y_{1}^{\prime} - {r_{1,1}^{\prime}X_{2}} - {r_{1,2}^{\prime}\overset{\_}{X}}}}^{2}}}} \\ {= {\underset{X_{2} \in c}{round}\left( \frac{Y_{1}^{\prime} - {r_{1,2}^{\prime}\overset{\_}{X}}}{r_{1,1}^{\prime}} \right)}} \end{matrix} & (27) \end{matrix}$

Finally, max-log LLRs for the bit corresponding to symbol X₁ can be computed as:

$\begin{matrix} {L_{p,i} = {{\max\limits_{X \in {S_{1}^{j}{(1)}}}\left\lbrack {- {D_{ED}\left( {{{\hat{X}}_{2}\left( X_{1} \right)},X_{1}} \right)}} \right\rbrack} - {\max\limits_{X \in {S_{1}^{j}{(0)}}}\left\lbrack {- {D_{ED}\left( {{{\hat{X}}_{2}\left( X_{1} \right)},X_{1}} \right)}} \right\rbrack}}} & (28) \end{matrix}$

where 1≦j≦M_(c).

If more T>2 antennas are considered the hard-output sequence and the (max-log) LLRs are not optimal because of error propagation through the layers from T−1 to 1.

The Distance and A-Priori Criteria

In the following, two different criteria to select the elements of U_(t) ( X) are described.

It is understood that equivalent approaches can be used, which is representative of an approach adapted to be indicated as a Turbo-Layered Orthogonal Lattice Detector (briefly T-LORD).

How to choose the elements X, to be included into each set U_(t)( X) will now be discussed.

A Max-Log-Map detector according to equation (6) is able to determine those two symbols (with a certain bit equal to one or zero) which maximize the metric D(X) by considering all possible transmitted sequences, i.e., at the expense of a prohibitive complexity. In this first embodiment, the T-LORD detector instead computes equation (13), i.e., selects two subsets of sequences S_(t) ^(j)(1), S_(t) ^(j)(0) as shown in equation (14) by separately maximizing −D_(ED) and D_(a):

$\begin{matrix} {X^{D} = {{\underset{X}{argmax}\left( {- D_{ED}} \right)} = {{\underset{X}{argmin}{{Y - {HX}}}^{2}} = {\underset{X}{argmin}D_{ED}}}}} & (29) \\ {X^{A} = {\underset{X}{argmax}{\sum\limits_{i = 1}^{T \cdot M_{c}}\; {{b_{i}(X)}\frac{L_{a,i}}{2}}}}} & (30) \end{matrix}$

where b_(i)={±1} and L_(a,i) represent the a-priori LLRs for the i-th bit of the transmit sequence X.

Considering X^(D) means selecting as one candidate sequence of the possible transmitted symbols the transmitted sequences with the smallest value of the Euclidean distance term and considering X^(A) means selecting as further candidate sequence of the remaining transmit symbols the transmit sequence with the largest a-priori information (L_(a)) of the symbol sequence.

It should be noted that equation (29) is computed only once while equation (30) is updated for every iteration, as the a-priori LLRs L_(a,j) change from one iteration to the other. In other words, this technique separately searches for the closest and the most a priori likely transmitted sequences, and approximates the joint maximization of equation (4) through separate maximization of (−D_(ED)) and D_(a). Using the terminology introduced in equation [22] for a different procedure, similarly equations (29) and (39) obey the distance and a priori criteria respectively.

As a further step, the arrangement described herein also involves a method to reduce the complexity of equation (29) and (30) by decoupling the search of the candidate sequences X for the different transmit antennas. As mentioned above, the complex modulated symbol X_(t) spans all the possible (QAM or PSK) constellation symbols, or a properly selected subset C. For each X_(t)= X value corresponding groups of transmit sequences X, denoted with U_(t)( X), are determined considering both X^(D) and X^(A) i.e.:

U _(t)( X )={X ^(D)(X _(t) = X ), X ^(A)(X _(t) = X )}  (31)

The technique drastically reduces the cardinality of the max-log-MAP detector by overall considering T sets U_(t), with t=1, . . . , T. If the cardinality of U_(t)( X) is kept low and independent of T, the complexity of the approximated max-log-MAP detector is linear versus T, instead of the exponential dependence 2^(Tm) ^(c) .

The sequence X° from equation (29) can be estimated according to the guidelines described in the former sections and in [21], namely performing a channel triangularization (for example a QR decomposition) and root conditioning as described by equations (18), (21) and (27). It is noted that [21] does not foresee processing a-priori information differently from the disclosed technique, which represents a very significant improvement of it.

From equation (18) follows:

$\begin{matrix} \begin{matrix} {D_{ED} = {\frac{1}{N_{0}}{{Y_{t}^{\prime} - {R_{t}X_{t}^{\prime}}}}^{2}}} \\ {= {\frac{1}{N_{0}}\left( {{{Y_{1}^{t} - {r_{1,1}^{t}X_{1}^{t}} - {\sum\limits_{k = 2}^{T}\; {r_{1,k}^{t}X_{k}^{t}}}}}^{2} + {{Y_{2}^{t} - {r_{2,2}^{t}X_{2}^{t}} - {\sum\limits_{k = 3}^{T}\; {r_{2,k}^{t}X_{k}^{t}}}}}^{2} + \ldots \mspace{14mu} + {{Y_{T}^{t} - {r_{T,T}^{t}X_{t}}}}^{2}} \right)}} \end{matrix} & (32) \end{matrix}$

According to equation (32), for every X_(t)= X the conditional decoded values of X₁ ^(t), . . . X_(T−1) ^(t), are determined recursively according to a spatial DFE principle as:

$\begin{matrix} {{{{\hat{X}}_{T - 1}^{t\mspace{14mu} D}\left( \overset{\_}{X} \right)} = {{round}\left( \frac{Y_{T - 1}^{t} - {r_{{T - 1},T}^{t}\overset{\_}{X}}}{r_{{T - 1},{T - 1}}^{t}} \right)}}\vdots {{{\hat{X}}_{1}^{t\mspace{14mu} D}\left( \overset{\_}{X} \right)} = {{round}\left( \frac{Y_{1}^{t} - {\sum\limits_{k = 2}^{T - 1}\; {r_{1,k}^{t}{\hat{X}}_{k}^{t\mspace{14mu} D}}} - {r_{1,T}^{t}\overset{\_}{X}}}{r_{1,1}^{t}} \right)}}} & (33) \end{matrix}$

Denoting these T−1 conditional decisions as {circumflex over (X)}_({) _(1,T−1}) ^(t D)( X), the resulting estimated sequence is:

{circumflex over (X)} ^(t D)( X )={{circumflex over (X)} _({1,T−1}) ^(t D)( X ), X}  (34)

and can be used as the estimate sequence of x^(D)(X_(t)= X).

It is noted that, for each candidate value of the reference transmit symbol (a hard-decision estimate of X^(D)), selecting as candidate sequence of the transmit symbols the transmit sequence with the smallest value of said Euclidean distance term (D_(ED)) can be estimated through spatial decision feedback equalization of the remaining transmit symbols ({circumflex over (X)}_({1,T−1}) ^(t D)( X)), computed starting from each candidate value of the reference transmitted symbol. The sequence {circumflex over (X)}^(t D)( X) is then obtained by grouping together (i.e. listing in a sequence of T symbols) the candidate value of the reference symbol, X_(t)= X, and the estimated sequence of the remaining transmitted symbols ({circumflex over (X)}{_(1,T−1}) ^(T d)( X)).

Specifically, a hard-decision estimate of X^(D) can be obtained as:

$\begin{matrix} {{\hat{X}}^{t\mspace{14mu} D} = {\underset{\overset{\_}{X} \in c}{argmin}\left\{ {D_{ED}\left( {{\hat{X}}^{t\mspace{14mu} D}\left( \overset{\_}{X} \right)} \right)} \right\}}} & (35) \end{matrix}$

In general {circumflex over (x)}^(t D)≠X^(D) (i.e. {circumflex over (X)}^(t D) is an estimate of X^(D)) even if X_(t) spans all the possible constellation symbols, because the procedure suffers error propagations from the intermediate layers (in general, all except the first and last one). So, for T>2, and also in the case of no a priori information, some performance degradation with respect to the ML detector may occur.

It is noted that (32)-(33) may be computed only once and used for several iterations.

Also, modifications of the present embodiment where the set C is changed from one iteration to the other (typically, reduced according to criteria based, e.g., on the ED metric, or the a-priori information, or both) are contemplated.

The a-priori criterion (30) also has a practical implementation, i.e., the most likely a-priori sequence X^(A) can be easily computed by first determining the relative bits based on the sign of the incoming LLRs L_(a,i) (and then remapping the bit sequence) as:

X^(t A)( X )=X:(X _(t) X ) AND {b _((i−1)M) _(c) _(+j)(X)=sign(L _(a,(i−1)M) _(c) _(+j))∀i≠t,j=1, . . . , M _(c)}  (36)

Finally, the desired set of sequences is given by:

U _(t)( X )={{circumflex over (X)} ^(t D)(X _(t) = X ), x ^(t A)(X _(t) = X )}  (37)

The set of sequences U_(t)( X) represents a set of sequences of the transmitted symbols, obtained by grouping together (i.e. listing in sequences of T symbols each) the candidate value of the reference symbol, x_(t)= X, and one estimated further set of sequences of the remaining (i.e. other than the candidate) transmitted symbols.

The two above simplified criteria lead to an overall number of considered sequences per iteration equal to 2S_(C)T≦2^(M) ^(c) ⁺¹T.

Smaller LLR Flipping Criterion

In this section a method to improve the performance of the previously described T-LORD detector is suggested. It proposes a different way to compute S₊. U_(t)( X), as defined in equation (31), and only includes the closest and most probable sequence, given a certain root X. A way to improve the performance of the T-LORD detector is increasing the number of sequences in U_(t)( X). This can be done acting on the a-priori metric, taking into account, i.e., also the second most likely X besides equation (30):

$\begin{matrix} {X^{F} = {\underset{X\backslash X^{A}}{argmax}{\sum\limits_{i = 1}^{T \cdot M_{c}}\; {{b_{i}(X)}\frac{L_{a,i}}{2}}}}} & (38) \end{matrix}$

Considering X^(F) means selecting as a further candidate sequence of the remaining transmit symbols the transmit sequence with the second largest a-priori information (L_(a)) of the symbol sequence.

It can be easily shown that the solution of (38) corresponds to (36) with the least reliable bit (i.e., bit having the minimum |L_(a,i)|) flipped.

The following equation shows the a priori criterion with the weakest LLR flipped, jointly applied to each layer, with the exception of the root:

$\begin{matrix} {{{X^{t\mspace{14mu} F}\left( \overset{\_}{X} \right)} = {X\text{:}\mspace{14mu} \left( {X_{t} = \overset{\_}{X}} \right)}}\mspace{14mu} {{AND}\begin{pmatrix} {{b_{{{({i - 1})}M_{c}} + j}(X)} = \left\{ \begin{matrix} {{sign}\left( L_{a,{{{({i - 1})}M_{c}} + j}} \right)} & {L_{a,{{{({i - 1})}M_{c}} + j}} \neq {\min\limits_{k \neq t}{L_{a,{{{({k - 1})}M_{c}} + j}}}}} \\ {{sign}\left( {- L_{a,{{{({i - 1})}M_{c}} + j}}} \right)} & {L_{a,{{{({i - 1})}M_{c}} + j}} = {\min\limits_{k \neq t}{L_{a,{{{({k - 1})}M_{c}} + j}}}}} \end{matrix} \right.} \\ {{\forall{i \neq t}},{j = 1},\ldots \mspace{14mu},M_{c}} \end{pmatrix}}} & (39) \end{matrix}$

Then, the desired set of sequences will be given by:

U _(t)( X )={{circumflex over (X)} ^(t D)( X ), X ^(t A)( X ), X ^(t F)( X)}  (40)

The embodiment described in the foregoing foresees computing U_(t) by approximating the joint maximization of (−D_(ED)) and D_(a) in equation (4) through a separate maximization of the two metric terms. The transmit sequences X to be considered for the separate maximization are determined by applying a same “criterion” to all the layers. In particular, the “distance criterion” (32)-(33) leads to approximating arg max(−D_(ED)(X)) ignoring D_(a), and vice versa the “a-priori criterion” computes arg max D_(a)(X) ignoring D_(ED).

As an alternative embodiment, the different criteria formerly mentioned can also be applied on a layer by layer basis. This way, the spatial DFE as in [21] is modified based on the possible correction term represented by the a-priori information available for the symbol under consideration at a given layer. In formulas, the idea is to specialize equation (4) for the different layers from T−1 to 1 after each channel triangularization has been computed; specifically, at every iteration, for the t-th process the “partial” a-posteriori probability metric for layer j can be written as:

$\begin{matrix} {{D_{p,j}^{t}\left( {\overset{\_}{X}}_{j}^{t} \right)} = {{{- \frac{1}{N_{0}}}{{Y_{j}^{t} - {r_{j,j}^{t}{\overset{\_}{X}}_{j}^{t}} - {\sum\limits_{k = {j + 1}}^{T}\; {r_{j,k}^{t}X_{k}^{t}}}}}^{2}} + {\sum\limits_{j = 1}^{M_{c}}\; {{b_{j}\left( {\overset{\_}{X}}_{j}^{t} \right)}\frac{L_{a,j}\left( X_{j}^{t} \right)}{2}}}}} & (41) \end{matrix}$

where L_(a,j)(X_(j) ^(t)) are the LLRs of the bits belonging to the symbol X_(j) ^(t) output by the decoder, X_(j) ^(t)= X _(j) ^(t), and b_(j)( X _(j) ^(t)) are the bits obtained by demapping X _(j) ^(t) expressed in antipodal notation.

Specifically, the partial a-posteriori probability metric in equation (41) is obtained by summing the opposite of a partial Euclidean distance term to an a-priori probability term for the selected candidate symbols.

The partial Euclidean distance term associated to the transmit symbol to be estimated is given for the generic layer j by:

$\frac{1}{N_{0}}{{Y_{j}^{t} - {r_{j,j}^{t}{\overset{\_}{X}}_{j}^{t}} - {\sum\limits_{k = {j + 1}}^{T}\; {r_{j,k}^{t}X_{k}^{t}}}}}^{2}$

and comprises computing the square magnitude of the difference between a processed received vector scalar term, and a summation of products, each product involving a coefficient of a triangularized channel state information matrix and a corresponding transmit symbol estimate.

Then, for every X_(T) ^(t)= X the conditional decoded values of X₁ ^(t) . . . X_(T−1) ^(t) are determined recursively as:

$\begin{matrix} {\begin{Bmatrix} {{{{\hat{X}}_{T - 1}^{t\mspace{14mu} D}\left( \overset{\_}{X} \right)} = {{round}\left( \frac{Y_{T - 1}^{t} - {r_{{T - 1},T}^{t}\overset{\_}{X}}}{r_{{T - 1},{T - 1}}^{t}} \right)}},} \\ {{\hat{X}}_{T - 1}^{t\mspace{14mu} A} = {\underset{X_{T - 1}^{t}}{argmax}{\sum\limits_{i = 1}^{\cdot M_{c}}\; {{b_{i}\left( X_{T - 1}^{t} \right)}\frac{L_{a,i}\left( X_{T - 1}^{t} \right)}{2}}}}} \end{Bmatrix}{{{\hat{X}}_{T - 1}^{t}\left( \overset{\_}{X} \right)} = {\underset{{\overset{\_}{X}}_{T - 1}^{t} \in {\{{{\hat{X}}_{T - 1}^{t\mspace{14mu} D},{\hat{X}}_{T - 1}^{t\mspace{14mu} A}}\}}}{argmax}{D_{p,{T - 1}}^{t}\left( {\overset{\_}{X}}_{T - 1}^{t} \right)}}}\begin{Bmatrix} {{{{\hat{X}}_{T - 2}^{t\mspace{14mu} D}\left( \overset{\_}{X} \right)} = {{round}\left( \frac{Y_{T - 2}^{t} - {r_{{T - 2},{T - 1}}^{t}{\overset{\_}{X}}_{T - 1}^{t}} - {r_{{T - 2},T}^{t}\overset{\_}{X}}}{r_{{T - 2},{T - 2}}^{t}} \right)}},} \\ {{\hat{X}}_{T - 2}^{t\mspace{14mu} A} = {\underset{X_{T - 2}^{t}}{argmax}{\sum\limits_{i = 1}^{\cdot M_{c}}\; {{b_{i}\left( X_{T - 2}^{t} \right)}\frac{L_{a,i}\left( X_{T - 2}^{t} \right)}{2}}}}} \end{Bmatrix}{{{\hat{X}}_{T - 2}^{t}\left( \overset{\_}{X} \right)} = {\underset{{\overset{\_}{X}}_{T - 2}^{t} \in {\{{{\hat{X}}_{T - 2}^{t\mspace{14mu} D},{\hat{X}}_{T - 2}^{t\mspace{14mu} A}}\}}}{argmax}{D_{p,{T - 2}}^{t}\left( {\overset{\_}{X}}_{T - 2}^{t} \right)}}}\begin{Bmatrix} {{{{\hat{X}}_{1}^{t\mspace{14mu} D}\left( \overset{\_}{X} \right)} = {{round}\left( \frac{Y_{1}^{t} - {\sum\limits_{k = 2}^{T - 1}\; {r_{1,k}^{t}{\hat{X}}_{k}^{t\mspace{14mu} D}}} - {r_{1,T}^{t}\overset{\_}{X}}}{r_{1,1}^{t}} \right)}},} \\ {{\hat{X}}_{1}^{t\mspace{14mu} A} = {\underset{X_{1}^{t}}{argmax}{\sum\limits_{i = 1}^{\cdot M_{c}}\; {{b_{i}\left( X_{1}^{t} \right)}\frac{L_{a,i}\left( X_{1}^{t} \right)}{2}}}}} \end{Bmatrix}{{{\hat{X}}_{1}^{t}\left( \overset{\_}{X} \right)} = {\underset{{\overset{\_}{X}}_{1}^{t} \in {\{{{\hat{X}}_{1}^{t\mspace{14mu} D},{\hat{X}}_{1}^{t\mspace{14mu} A}}\}}}{argmax}{D_{p,1}^{t}\left( {\overset{\_}{X}}_{1}^{t} \right)}}}} & (42) \end{matrix}$

It is noted that estimating for each candidate value (X_(T) ^(t)= X) a sequence of the remaining (i.e. other than the candidates) transmitted symbols (X₁ ^(t), . . . X_(T−1) ^(t)) includes the steps of:

-   -   estimating the remaining transmit symbols in turn one at a time,         in a successive detection fashion;     -   calculating the partial Euclidean distance term associated to         the transmit symbol to be estimated;     -   selecting as one candidate transmitted symbol the transmitted         symbol with the smallest value of said partial Euclidean         distance term—denoted as {circumflex over (X)}_(k) ^(t D)( X)         for the k-th layer—which can be simply computed through slicing         to the closest constellation element, denoted by the round         function in (42);     -   selecting as further candidate transmitted symbol the transmit         symbol with the largest a-priori information (L_(a)) of said         symbol (denoted as {circumflex over (X)}_(k) ^(tA) for the k-th         layer);     -   calculating the partial a-posteriori probability metric (41)         associated to the transmit symbol to be estimated;     -   selecting as estimated transmit symbol (denoted as {circumflex         over (X)}_(k) ^(t) ( X) for the k-th layer) the symbol that         maximizes said partial a-posteriori probability metric.

It is noted that at a first stage of detection no a-priori information is available, i.e. equi-probable symbols are considered and (41)-(42) coincide with equations (32) and (33). Starting from the first iteration, L_(a,i)≠0 and (41)-(42) need to be computed and updated at every iteration.

Similarly to equation (36):

{circumflex over (X)} _(j) ^(t A) =X:{b _(i)(X)=sign(L _(a,i)) ∀i=1, . . . , M _(c)}  (43)

Denoting the T−1 conditional decisions as {circumflex over (X)}_((1,T−1)) ^(t)( X), one has:

{circumflex over (X)} _({1,T}) ^(t)( X )={{circumflex over (X)}_({1,T−1}) ^(t)( X ), X}

S _(t)( X )≡U _(t)( X )≡{circumflex over (X)} _({1,T}) ^(t)( X )  (44)

Then, a-posteriori LLRs can be computed using equations (9)-(14).

The two above simplified criteria lead to an overall number of considered sequences per iteration equal to S_(C)T≦2^(M) ^(c) ¹T, while the complexity of computing (44) is equivalent to that of using (37) in terms of number of real multipliers (RMs). Complexity-wise, the main difference lies in a higher number of comparisons as witnessed by (42). Considering this embodiment, however, is motivated by a significant performance benefit in some configurations, in particular when T>2.

In this case an additional criterion can be applied in order to enhance the performance of the invention at the expense of enlarging the set of possible candidates at each layer level. For instance this can be obtained by generalizing the “smaller LLR flipping criterion” presented previously, specifically for the j-th layer:

$\begin{matrix} {{\hat{X}}_{j}^{t\mspace{14mu} F} = {\underset{X_{j}^{t}\backslash {\hat{X}}_{j}^{t\mspace{14mu} A}}{argmax}{\sum\limits_{i = 1}^{\cdot M_{c}}\; {{b_{i}\left( X_{j}^{t} \right)}\frac{L_{a,i}\left( X_{j}^{t} \right)}{2}}}}} & (45) \end{matrix}$

Similarly to equation (39):

$\begin{matrix} {{\hat{X}}_{j}^{t\mspace{14mu} F} = {X\text{:}\mspace{14mu} \begin{pmatrix} {{b_{i}(X)} = \left\{ \begin{matrix} {{sign}\left( L_{a,i} \right)} & {L_{a,i} \neq {\min\limits_{k}{L_{a,k}}}} \\ {{sign}\left( {- L_{a,i}} \right)} & {L_{a,i} = {\min\limits_{k}{L_{a,k}}}} \end{matrix} \right.} \\ {{{\forall i} = 1},\ldots \mspace{14mu},M_{c}} \end{pmatrix}}} & (46) \end{matrix}$

Then, the estimate {circumflex over (X)}_(j) ^(t) can be determined as a function of x_(T) ^(t)= X generalizing equation (42) as:

$\begin{matrix} {{{\hat{X}}_{j}^{t}\left( \overset{\_}{X} \right)} = {\underset{{\overset{\_}{X}}_{j}^{t} \in {\{{{\hat{X}}_{j}^{t\mspace{14mu} D},{\hat{X}}_{j}^{t\mspace{14mu} A},{\hat{X}}_{j}^{t\mspace{14mu} F}}\}}}{argmax}{D_{p,j}^{t}\left( {\overset{\_}{X}}_{j}^{t} \right)}}} & (47) \end{matrix}$

Considering also {circumflex over (X)}_(k) ^(t F) as a candidate transmitted symbol for the k-th layer in the successive detection process (42) means selecting as a further candidate transmitted symbol, the transmitted symbol with the second largest a-priori information (L_(a)) of the symbol.

Modifications of the present embodiment where the set C is changed from one iteration to the other (typically, reduced according to criteria based, e.g., on the ED metric, or the a-priori information, or both) are contemplated.

In other words, an embodiment of the invention also includes any of the previous preferred embodiments, wherein identifying a set of values for at least one reference transmitted symbol, the possible values representing candidate values, comprises determining a set of possible values whose cardinality changes as a function of the considered processing iteration, and typically is reduced for an increasing number of iterations.

A possible embodiment includes, but is not limited to, the following formulation. {circumflex over (X)}_(T,k) ^(t) is denoted as the estimate of the symbol X_(T) ^(t)=X_(t) computed at the k-th iteration, which can be obtained from equation (35). At the first stage of the detection (k=0) {circumflex over (X)}_(T,0) ^(t)≡{circumflex over (X)}_(T) ^(t D) is assumed. This might be obtained for instance also from equation (35) (which is a particular case of equation (12)). Then, from k=1 onwards, when L_(a,i)≠0 are available from the decoder, it is possible to determine just one candidate symbol {circumflex over (X)}_(T,k) ^(t) to pass to the upper layers according to:

$\begin{matrix} {\begin{Bmatrix} {{{\hat{X}}_{T,k}^{t\mspace{14mu} D} = {\hat{X}}_{T,0}^{t\mspace{14mu} D}},} \\ {{\hat{X}}_{T,k}^{t\mspace{14mu} A} = {\underset{X_{T}^{t}}{argmax}{\sum\limits_{i = 1}^{\cdot M_{c}}\; {{b_{i}\left( X_{T}^{t} \right)}\frac{L_{a,i,k}\left( X_{T}^{t} \right)}{2}}}}} \end{Bmatrix}{{\hat{X}}_{T,k}^{t} = {\underset{{\overset{\_}{X}}_{T}^{t} \in {\{{{\hat{X}}_{T,k}^{t\mspace{14mu} D},{\hat{X}}_{T,k}^{t\mspace{14mu} A}}\}}}{argmax}{D_{p,T}^{t}\left( {\overset{\_}{X}}_{T}^{t} \right)}}}} & (48) \end{matrix}$

where L_(a,i,k) are the a-priori LLRs for the i-th bit in the sequence and iteration k.

Then, the remaining symbols may be estimated according to (42) where just one candidate symbol X≡{circumflex over (X)}_(T,k) ^(t) is considered instead of all XεC.

Alternatively, at each iteration k the estimate {circumflex over (X)}_(T) ^(t) result of the iteration k−1 may be used as one of the two starting candidates (the other is still given by the maximization of the a-priori LLRs as usual):

$\begin{matrix} {\begin{Bmatrix} {{{\hat{X}}_{T,k}^{t\mspace{14mu} p} = {\hat{X}}_{T,{k - 1}}^{t}},} \\ {{\hat{X}}_{T,k}^{t\mspace{14mu} A} = {\underset{X_{T}^{t}}{argmax}{\sum\limits_{i = 1}^{\cdot M_{c}}\; {{b_{i}\left( X_{T}^{t} \right)}\frac{L_{a,i,k}\left( X_{T}^{t} \right)}{2}}}}} \end{Bmatrix}{{\hat{X}}_{T,k}^{t} = {\underset{{\overset{\_}{X}}_{T}^{t} \in {\{{{\hat{X}}_{T,k}^{t\mspace{14mu} p},{\hat{X}}_{T,k}^{t\mspace{14mu} A}}\}}}{argmax}{D_{p,T}^{t}\left( {\overset{\_}{X}}_{T}^{t} \right)}}}} & (49) \end{matrix}$

where {circumflex over (X)}_(T,k) ^(t p) stands for the first “partial” estimate and replaces {circumflex over (X)}_(T,k) ^(t D) in (48).

Both solutions (48) and (49) yield a clear complexity advantage as only one straightforward sequence is considered at each iteration for k≧1. As in both cases using such a small number of sequences may not be enough to update the LLRs relative to the whole transmit sequence for iteration k with k≧1, a possible work-around is to update anyway the LLRs relative to the bits not part of the newly selected hard estimate {circumflex over (X)}_(k) ^(t), using the updated a-priori information L_(a,i,k) coming from the outer soft decoder.

The analysis developed previously in describing the first embodiment considered in the foregoing determines U_(t)( X) by applying the same criteria, i.e., either the distance or the a-priori criterion, at a layer to all the layers. As a consequence, the estimated sequence S_(t) may not be optimal, as it may suffer from error propagation. To mitigate this effect, U_(t)( X) may include those symbols chosen with different criteria over different layers. For instance, in case of T=3 the following possibilities exist for t=2:

U ₂( X )={X _({1,3}) ^(2 D)( X ),X _({1,3}) ^(2 A)( X ),X _({1},{3}) ^(2 D,A)( X ),X _({3},{1}) ^(2 D,A)( X )}  (50)

The last two elements in (50) explicitly show the list of those layers processed following the respective criterion in the apex: this is just an example of the most general hyper-symbol X_(S) _(D) _(,S) _(A) _(,S) _(F) ^(t D,A,F)( X), where S^(D), S^(A), S^(F) denote the indexes of the layers subject to the distance, a-priori, LLR-flipping criteria, respectively. Any possible combination of the above presented criteria is possible.

The choice of branching over each intermediate layer causes a complexity growth; i.e., if all three criteria are considered at each layer level, then 3^(T−1)S_(C)T sequences per iteration are to be considered instead of the 2S_(C)T obtained adopting separately only the a priori and distance criteria, as proposed for the basic version of the technique (i.e., the first embodiment).

In further possible embodiments, the “T-LORD” arrangement described herein may also be formulated in the real domain if a suitable “lattice” (i.e., real domain) representation, is derived prior to the stages formerly described.

Specifically, another embodiment is to adopt a real representation of the MIMO system equation (1) where the in-phase (I) and quadrature-phase (Q) components of the complex quantities are ordered as:

x=[X _(1,I) X _(1,Q) . . . X_(T,I) X _(T,Q)]^(T) =[x ₁ x ₂ . . . x _(2T)]^(T)

y=[Y _(1,I) Y _(1,Q) . . . Y _(R,I) Y _(R,Q)]^(T) =[y ₁ y ₂ . . . y _(2R)]^(T)

n=[N _(1,I) N _(1,Q) . . . N _(R,I) N _(R,Q)]hu T

y=hx+n=[h ₁ . . . h _(2T) ]x+n  (51)

h is a real channel matrix of size 2R×2T where the channel columns then have the form:

h _(2k−1) =[Re(H _(1,k))Im(H _(1,k)) . . . Re(H _(R,k))Im(H _(R,k))]^(T)

h _(2k) =[−Im(H _(1,k))Re(H _(1,k)) . . . −Im(H _(R,k))Re(H _(R,k))]^(T)  (52)

where the elements H_(j,k) are entries of the (complex) channel matrix H.

As a consequence of this formulation, the pairs h_(2k-1) ^(T), h_(2k) are already orthogonal, i.e., h_(2k-1) ^(T) h_(2k)=0, and this property may prove to be very effective for the procedure. Other useful relations are:

∥h _(2k-1)∥² =∥h _(2k)∥²

h _(2k-1) ^(T) h _(2j-1) =h _(2k) ^(T) h _(2j), h_(2k-1) h _(2j) =−h _(2k) ^(T) h _(2j-1)  (53)

where k, j={1, . . . , T} and k≠j.

Using this formulation, all formerly presented embodiments may be translated into an equivalent real-domain representation. Namely, the first three embodiments discussed in the foregoing may be implemented in the real domain according to the three further embodiments discussed in the following, where the equations for the channel processing are given while the remainder of the real-domain formulation is omitted for brevity.

Channel Processing and Demodulation

From (51)-(53) the I and Q of the complex symbols may be demodulated independently thus allowing the same degree of parallelism of the complex domain formulation, as clear from the following. As mentioned, the idea to simplify computations is to focus on one symbol, the X_(t)=(X_(t,I) X_(t,Q))=(x_(t−1), x_(t)) symbol, transmitted by the t-th antenna, and consider for the I and Q all the possible PAM values, or properly selected subsets, denoted by m_(I) and m_(Q) for X_(t,I), X_(t,Q) respectively, with respective cardinality S_(mI), S_(mQ). For each of the S_(mI)·S_(mQ) possible cases ( X _(t−1), X _(t)), as many corresponding groups of transmit sequences X, denoted with U_(t)( X _(t−1), X _(t)), are determined. The final set S_(t) is then built by choosing those elements in U_(t) maximizing equation (4):

$\begin{matrix} {S_{t} = \left\{ {{\underset{x \in {U_{t}{({{\overset{\_}{X}}_{t - 1},{\overset{\_}{X}}_{t}})}}}{argmax}{D(x)}},{\forall{{\overset{\_}{x}}_{t - 1} \in m_{I}}},{\forall{{\overset{\_}{x}}_{t} \in m_{Q}}}} \right\}} & (54) \end{matrix}$

In order to decouple the problem in turn for the different transmit antennas, and for the I and Q components belonging to the complex symbol transmitted by an antenna, and efficiently determine U_(t), it is useful to perform a channel matrix “triangularization” process, meaning that through proper processing it is factorized in two or more product matrices one of which is triangular. It is understood that different matrix processing may be applied to H. Examples include, but are not limited to, QR and Cholesky decomposition procedures [30]. In the following QR will be used, without loss of generality.

To simplify computations, one may introduce the permutation matrix π_(t), which circularly shifts the elements of x (and consequently the order of the columns of x, too), such that the pair (x_(t−1), x_(t)) under investigation moves to the last two positions:

π_(t) =[u ₂₍ t−1)-1 u ₂₍ t−1) . . . u ₁ u ₂ . . . u _(2t−1) u _(2t)]^(T)  (55)

where u_(i) is a column vector of length 2T with all zeros but the i-th element equal to one.

Consequently, equation (51) can be rewritten as:

y=hπ _(t) ⁻¹π_(t) x+n=hπ _(t) ^(T)π_(t) x+n  (56)

T different QR decompositions are performed, one for each π_(t):

hπ _(t) ^(T) =q _(t) r _(t)  (57)

where q_(t) is an orthonormal matrix of size 2R×2T and r_(t) is a 2T×2T upper triangular matrix having the structure:

$\begin{matrix} {r_{t} = \begin{bmatrix} r_{1,1} & 0 & \cdots & r_{1,{{2{({t - 1})}} - 1}} & r_{1,{2{({t - 1})}}} & r_{1,{{2\; t} - 1}} & r_{1,{2\; t}} \\ 0 & r_{2,2} & \ldots & r_{2,{{2{({t - 1})}} - 1}} & r_{2,{2{({t - 1})}}} & r_{2,{{2\; t} - 1}} & r_{2,{2\; t}} \\ \vdots & \vdots & \ddots & \vdots & \vdots & \vdots & \vdots \\ 0 & 0 & \ldots & r_{{{2{({t - 1})}} - 1},{{2{({t - 1})}} - 1}} & 0 & r_{{{2{({t - 1})}} - 1},{{2\; t} - 1}} & r_{{{2{({t - 1})}} - 1},{2\; t}} \\ 0 & 0 & \ldots & 0 & r_{{2{({t - 1})}},{2{({t - 1})}}} & r_{{2{({t - 1})}},{{2\; t} - 1}} & r_{{2{({t - 1})}},{2\; t}} \\ 0 & 0 & \ldots & 0 & 0 & r_{{{2\; t} - 1},{{2\; t} - 1}} & 0 \\ 0 & 0 & \ldots & 0 & 0 & 0 & r_{{2\; t},{2\; t}} \end{bmatrix}} & (58) \end{matrix}$

Interestingly, the entries at position (2k−1, 2k) are zeros. This is a consequence of equations (51)-(53) and specifically of h_(2k-1) ^(T) h_(2k)=0, and it is of basic importance to be able to independently (i.e., in parallel) treat the I and Q of complex modulated symbols X_(k).

The ED metrics of equation (4) may be rewritten as:

$\begin{matrix} {D_{ED} = {{{- \frac{1}{N_{0}}}{{y - {hx}}}^{2}} = {{{- \frac{1}{N_{0}}}{{y - {q_{t}r_{t}n_{t}x}}}^{2}} = {{{- \frac{1}{N_{0}}}{{{q_{t}^{T}y} - {r_{t}n_{t}x}}}^{2}} = {{- \frac{1}{N_{0}}}{{y_{t}^{\prime} - {r_{t}x_{t}^{\prime}}}}^{2}}}}}} & (59) \end{matrix}$

where y_(t)′=q_(t) ^(T)y and x_(t)′=π_(t)x.

It is useful to enumerate the rows of r_(t) from top to bottom and create a correspondence with the different I and Q of the different layers, ordered as in x_(t)′. This way (x_(t−1), x_(t)) are located in the last two positions of x_(t)′ and correspond to the last rows of r_(t), which acts as an equivalent triangular channel. The demodulation principle is to select the T-th layer as the reference one and determine for it a list of candidate I and Q values. Then, for each sequence in the list, interference is cancelled from the received signal and the remaining PAM estimates are determined through interference nulling and cancelling, or spatial DFE. Exploiting the triangular structure of the channel, the estimation of the remaining 2T−2 real components of the symbols can be simply implemented through a slicing operation to the closest PAM coordinate, thus entailing a negligible complexity. More details on this demodulation principle, can be found in [21]. It is noted that [21] does not foresee processing a-priori information differently from the present technique, which represents a very significant improvement of it.

Using (51)-(59) all the formulations previously described in the complex domain can be generalized in a straightforward way and thus represent other embodiments for the present invention.

FIG. 6A and FIG. 6B are flowcharts illustrating the means or steps for performing the specified functions according to one or more embodiments of the present invention. They both refer to a single iteration process.

Specifically, FIG. 6A illustrates, according to an embodiment, the means or steps performed by a receiver comprising an iterative detection and decoding of multiple antenna communications that detects sequences of digitally modulated symbols transmitted by multiple sources, wherein the detector generates extrinsic bit soft output information processing the a-priori information provided by a soft-output decoder. The detector approximates the computation of the maximum a-posteriori transmitted sequence by determining two sets of candidates, processed by two distinguishable units, or processors. One unit receives as input the processed received sequence and processed channel state information matrix. The other unit processes as input the a-priori bit soft information.

FIG. 6B illustrates, according to an embodiment, the means or steps performed by a receiver comprising an iterative detection and decoding of multiple antenna communications that detects sequences of digitally modulated symbols transmitted by multiple sources, wherein the detector generates extrinsic bit soft output information processing the a-priori information provided by a soft-output decoder. The detector approximates the computation of the maximum a-posteriori transmitted sequence by determining a set of candidates obtained by properly processing the received sequence, the channel state information matrix, the a-priori bit soft information.

The arrangement described herein, according to an embodiment, achieves near-optimal (i.e., near MAP) performance for a high number of transmit antennas, with a much lower complexity as compared to a MAP detection and decoding method and apparatus. Moreover, the arrangement described herein is suitable for highly parallel hardware architectures.

Referring to FIG. 6A, block 320 includes all the blocks that repeat their processing for a number of times equal to the number of transmit antennas, each time changing some parameter, or reading different memory stored values, related to the transmit antenna index.

Block 602 represents, according to an embodiment, the means for or step of pre-processing the system equation (1) and particularly of the channel matrix and the received vector, in order to factorize the channel matrix into a product of matrices one of which is a triangular matrix. As an illustrative example, the channel matrix may be decomposed into the product of an orthogonal matrix and a triangular matrix. The process is repeated for a number of times equal to the number of transmit antennas, where each time the column of the input the channel matrix are disposed according to a different order.

Block 604 includes, according to an embodiment, all the blocks that repeat their processing for a number of times equal to the number of elements included in the set C spanned by the reference symbols X_(t), in each case assigning a different value to X_(t). As those blocks are also included in 320, this means that this has to be done for each t=1, . . . , T.

Block 606 represents, according to an embodiment, the means for or step of computing {circumflex over (x)}^(t D)( X) as exemplified in equations (32)-(34).

Block 608 represents, according to an embodiment, the means for or step of computing X^(t A)( X) as exemplified in equations (30) and (36).

Block 610 represents, according to an embodiment, the means for or step of determining the desired set of candidate transmit sequences U_(t)( X).

Block 612 represents, according to an embodiment, the means for or step of determining a subset of sequences S_(t)( X) as shown in equation (8) or alternatively S_(t)′( X) as shown in equation (10), and storing the related metric D(X) for XεS_(t)( X) (or alternatively XεS_(t)′( X)).

Block 614 represents, according to an embodiment, the means for or step of computing the a-posteriori bit LLRs L_(p) as shown in equation (13). Once L_(p) are available, a final subtraction of the input a-priori LLRs is sufficient to generate the extrinsic L_(e) as for equation (7, i.e. the extrinsic information (L_(e)) is calculated from the a-priori information (L_(a)) and the a-posteriori information (L_(p)).).

Referring to FIG. 6B, block 320 includes all the blocks that have to repeat their processing for a number of times equal to the number of transmit antennas, each time changing some parameter, or reading different memory stored values, related to the such transmit antenna index.

Block 602 represents, according to an embodiment, the means for or step of pre-processing the system equation (1) and particularly of the channel matrix and the received vector, in order to factorize the channel matrix into a product of matrices one of which is a triangular matrix. As an illustrative example, the channel matrix can be decomposed into the product of an orthogonal matrix and a triangular matrix. The process is repeated for a number of times equal to the number of transmit antennas, where each time the column of the input the channel matrix are disposed according to a different order.

Block 604 includes, according to an embodiment, all the blocks that repeat their processing for a number of times equal to the number of elements included in the set C spanned by the reference symbols X_(t), in each case assigning a different value to X_(t). As those blocks are also included in 600, this means that this has to be done for each t=1, . . . , T.

Block 616 represents, according to an embodiment, the means for or step of determining the desired set of candidate transmit sequences U_(t)( X).

Block 612 represents, according to an embodiment, the means for or step of determining a subset of sequences S_(t)( X) as shown in equation (8) or alternatively S_(t)′( X) as shown in equation (10), and storing the related metric D(X) for XεS_(t)( X) (or alternatively XεS_(t)′( X)

Block 614 represents, according to an embodiment, the means for or step of computing the a-posteriori bit LLRs L_(p) as shown in equation (13). Once L_(p) are available, a final subtraction of the input a-priori LLRs is sufficient to generate the extrinsic L_(e) as for equation (7).

As noted above, channel state information is assumed to be known at the receiver. Therefore, the receiver may include a set of rules having as input:

-   -   the (complex) received vector observations,     -   the (complex) gain channel paths between the transmit and         receive antennas, and     -   the properties of the desired QAM (or PSK) constellation to         which the symbols belong.

Consequently, without prejudice to the underlying principles of the invention, the details and the embodiments may vary, even appreciably, with reference to what has been described by way of example only, without departing from the scope of the invention.

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1. A method of detecting sequences of digitally modulated symbols, said modulated symbols being transmitted by multiple transmitting sources and received by multiple receiving elements and grouped as a received vector of sequences of digitally modulated symbols, wherein said method includes the step of: identifying a set of values for at least one reference transmit symbol, the possible values representing candidate values; estimating for each candidate value at least one further set of sequences of the remaining transmitted symbols; determining for each candidate value a set of sequences of transmitted symbols obtained by grouping said candidate values and said estimated values; calculating a metric for each of said sequence of transmitted symbols, selecting the sequence that maximizes said metric, one for each candidate value, and storing the value of the related metric and the associated selected sequence.
 2. The method of claim 1, wherein said method receives a channel state information matrix from a first module and a-priori information on said modulated symbols from a second module.
 3. The method of claim 2, wherein said method includes the step of ordering the layers considered for the detection.
 4. The method of claim 2, wherein said at least one further set of sequences of transmitted symbols is estimated from at least: said vector of received sequences of digitally modulated symbols, said channel state information matrix, and said a-priori information.
 5. The method of claim 2, wherein said metric is calculated from at least: said vector of received sequences of digitally modulated symbols, said channel state information matrix, said a-priori information.
 6. The method of claim 1, wherein processing of said method is performed in the complex domain by calculating real and imaginary parts.
 7. The method of claim 2, wherein processing said channel state information matrix includes a triangularization step of said channel state information matrix.
 8. The method of claim 7, wherein processing said complex channel state information matrix includes the steps of: factorizing said channel state information matrix into an orthogonal matrix and a triangular matrix.
 9. The method of claim 8 wherein said number of receiving means is equal to the number of transmitting means minus one.
 10. The method of claim 9, wherein processing said complex channel state information matrix includes the steps of: factorizing said channel state information matrix into an orthogonal matrix and a triangular matrix with its last row eliminated.
 11. The method of claim 8, wherein processing said complex vector of received sequences of digitally modulated symbols includes: multiplying said transpose conjugate of the orthogonal matrix by said received vector.
 12. The method of claim 7, wherein processing said complex channel state information matrix includes the steps of: forming a Gram matrix using said channel state information matrix, performing a Cholesky decomposition of said Gram matrix, and calculating the called Moore-Penrose matrix as an inverse of said channel state information matrix (H), resulting in a pseudoinverse matrix.
 13. The method of claims 12, wherein processing said complex vector of received sequences of digitally modulated symbols includes the steps of: multiplying said pseudoinverse matrix by the received vector.
 14. The method of claim 1, wherein said estimating for each candidate value at least one further set of sequences of the remaining transmitted symbols includes the steps of: calculating the Euclidean distance term between said received vector and the product of the channel state information matrix (H) and said possible transmit sequence, and selecting as one candidate sequence of the possible transmitted symbols the transmitted sequences with the smallest value of said Euclidean distance term, and selecting as a further candidate sequence of the remaining transmit symbols the transmit sequence with the largest a-priori information of said symbol sequence.
 15. The method of claim 14, wherein said estimating for each candidate value at least one further set of sequence of transmitted symbols includes the steps of: selecting as a further candidate sequence of the remaining transmit symbols the transmit sequence with the second largest a-priori information (L_(a)) of said symbol sequence.
 16. The method of claim 1, wherein said calculating a metric for each said sequences of transmitted symbols includes the steps of: calculating an a-posteriori probability metric.
 17. The method of claim 14, wherein said calculating a-posteriori probability metric includes the steps of: summing the opposite of said Euclidean distance term to said a-priori probability term for said selected candidate sequences.
 18. The method of any claims 17, wherein said selecting the sequence that maximizes said metric includes the steps of: selecting said sequence that maximizes the sum of the opposite of said Euclidean distance term and said a-priori probability term.
 19. The method of claim 14, wherein said selecting as candidate sequence of the possible transmit symbols the transmit sequence with the smallest value of said Euclidean distance term is estimated through spatial decision feedback equalization of the remaining transmit symbols, starting from each candidate value of the reference transmitted symbol. 20.-39. (canceled)
 40. A method, comprising: receiving respective signals from multiple transmit antennas over a channel having a response, each of the signals having respective components, the signals together representing a symbol; generating values in response to first and second channel-response coefficients that are respectively associated with first and second ones of the signal components; generating candidates for the symbol in response to the values; decoding each of the candidates; generating a respective metric for each candidate in response to the decoding; and identifying the symbol the as the candidate having the metric that meets a criterion. 